Abstract
Let X 1, X 2, ..., X n be a random sample from a normal population with mean μ and variance σ 2. In many real life situations, specially in lifetime or reliability estimation, the parameter μ is known a priori to lie in an interval [a, ∞). This makes the usual maximum likelihood estimator (MLE) ̄ an inadmissible estimator of μ with respect to the squared error loss. This is due to the fact that it may take values outside the parameter space. Katz (1961) and Gupta and Rohatgi (1980) proposed estimators which lie completely in the given interval. In this paper we derive some new estimators for μ and present a comparative study of the risk performance of these estimators. Both the known and unknown variance cases have been explored. The new estimators are shown to have superior risk performance over the existing ones over large portions of the parameter space.
This is a preview of subscription content, log in via an institution to check access.
References
Brewster JF, Zidek JV (1974) Improving on equivariant estimators. Ann. Statist. 2, 21–38.
Farrell RH (1964) Estimators of a location parameter in the absolutely continuous case. Ann. Math. Statist. 35, 949–998.
Ghosh M (1974) Admissibility and minimaxity of some maximum likelihood estimators when the parameter space is restricted to integers. J. Roy. Statist. Soc. Ser. B 37, 264–271.
Ghosh M and Meeden G (1978) Admissibility of the MLE of the normal integer mean. Sankhya B 40, 1–10.
Gupta AK and Rohatgi VK (1980) On the estimation of restricted mean. J. Statist. Plan. Infer. 4, 369–379.
Hammersley JM (1950) On estimating restricted parameters. J. Roy. Statist. Soc. Ser. B 12, 192–229.
Heiny RL and Siddiqui MM (1970) Estimation of the parameters of a normal distribution when the mean is restricted to a interval. Aus. J. Statist. 12, 112–117.
Katz MW (1961) Admissible and minimax estimates of parameters in truncated spaces. Ann. Math. Statist. 32, 136–142.
Khan RA (1973) On some properties of Hammersley’s estimator of an integer mean. Ann. Statist. 1, 838–850.
Kumar S, Sharma D (1988) Simultaneous estimation of ordered parameters. Comm. Statist. Theory Methods 17, 4315–4336.
Lehmann EL, Casella G (1998) Theory of Point Estimation, Second Edition. Springer-Verlag, New York.
Moors JJA (1985) Estimation in truncated parameter spaces. Ph.D. Thesis. Tilburg University, Netherlands.
Sacks J (1963) Generalized Bayes solutions in estimation problems. Ann. Math. Statist. 34, 751–768.
Shao PYi-S, Strawderman WE (1996) Improving on the MLE of a positive normal mean. Statistica Sinica 6, 259–274.
Stein C (1981) Estimation of the mean of a multivariate normal distribution. Ann. Statist. 9, 1135–1151.
Stroud TWF (1974) Combining unbiased estimates of a parameter known to be positive. J. Amer. Statist. Assoc. 69, 502–506.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Tripathi, Y.M., Kumar, S. Estimating a positive normal mean. Statistical Papers 48, 609–629 (2007). https://doi.org/10.1007/s00362-007-0360-5
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/s00362-007-0360-5
Keywords
- maximum likelihood estimator
- Rao-Blackwellization
- generalized Bayes estimator
- minimaxity
- scale equivariant estimator
- admissibility